Homogeneity in the bi-limit as a tool for observer and feedback design

Author

Andrieu, Vincent ; Praly, Laurent ; Astolfi, Alessandro

Author_Institution

LAAS-CNRS, Univ. of Toulouse, Toulouse, France

fYear

2009

fDate

15-18 Dec. 2009

Firstpage

1050

Lastpage

1055

Abstract

We introduce an extension of the notion of homogeneous approximation to make it valid both at the origin and at infinity (homogeneity in the bi-limit). Exploiting this extension, we give several results concerning stability, robustness and uniform (in the initial condition) finite time convergence for a homogeneous in the bi-limit vector field. We then introduce a homogeneous in the bi-limit observer and state-feedback for a chain of integrators. Combining these two tools we establish a global asymptotic stabilization result by output feedback for feedback and feedforward systems. We obtain also a finite time observer for globally Lipschitz system.

Keywords

approximation theory; convergence of numerical methods; feedforward; nonlinear systems; observers; state feedback; bi limit observer; bi limit vector field; feedback design; feedback systems; feedforward systems; finite time convergence; global asymptotic stabilization; globally Lipschitz system; homogeneous approximation; observer design; output feedback; state feedback; Control systems; Convergence; Feedforward systems; H infinity control; Linear feedback control systems; Nonlinear control systems; Nonlinear systems; Output feedback; Polynomials; Robust stability;

fLanguage

English

Publisher

ieee

Conference_Titel

Decision and Control, 2009 held jointly with the 2009 28th Chinese Control Conference. CDC/CCC 2009. Proceedings of the 48th IEEE Conference on

Conference_Location

Shanghai

ISSN

0191-2216

Print_ISBN

978-1-4244-3871-6

Electronic_ISBN

0191-2216

Type

conf

DOI

10.1109/CDC.2009.5400263

Filename

5400263